104 Chapter 4Differentiation
Linear combination of functions
A linear combination of the functions u, v, and wof xhas the form
y 1 = 1 au(x) 1 + 1 bv(x) 1 + 1 cw(x) (4.12)
where a, b, and care constants. Such a function can be differentiated term by term; by
Rules 1 and 2 in Table 4.3,
(4.13)
EXAMPLE 4.11Differentiatey 1 = 12 x
31 + 13 e
x1 − 11 ln 1 x.
By Equation (4.13),
0 Exercises 27, 28
The product rule
The function
y 1 = 1 (2x 1 + 13 x
2)(5 1 + 17 x
3)
can be differentiated by treating it as the producty 1 = 1 uvwhereu 1 = 1 (2x 1 + 13 x
2)and
v 1 = 1 (5 1 + 17 x
3). Then, by Rule 3 in Table 4.3,
= 1 (2x 1 + 13 x
2)(21x
2) 1 + 1 (5 1 + 17 x
3)(2 1 + 16 x)
This may now be simplified. In this example it is equally simple to multiply out the
original product and differentiate term by term, but in many cases the brute force
approach is more difficult than use of the product rule.
=+( )()()( )2 3 57 57+ ++ + 2 3
233 2xx
d
dx
xx
d
dx
xx
dy
dx
u
d
dx
du
dx
=+
v
v
=+− 63
1
2
2xe
x
xdy
dx
d
dx
x
d
dx
e
d
dx
xxe
xx=+− =×+×−× 23
1
2
23 3
1
2
1
32ln
xx
12dy
dx
a
du
dx
b
d
dx
c
d
dx
=++
vw